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40 votes
A ladder is leaning against the top of an 8.9 m wall. If the bottom of the ladder is 4.7 M from the bottom of the wall, then the angle between the ladder and the wall is

User Lhoworko
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1 Answer

24 votes
24 votes

The system described in the question can be presented diagrammatically as shown below:

We can then bring out a diagram to solve as follows:

The angle θ is the required angle that we are to solve for.

We can use the Tangent Trigonometric Ratio to solve. The ratio is given to be


\tan \theta=\frac{\text{opp}}{\text{adj}}

From the triangle,


\begin{gathered} \text{opp = 4.7} \\ \text{adj = 8.9} \end{gathered}

Substituting these values, we have


\begin{gathered} \tan \theta=(4.7)/(8.9) \\ \tan \theta=0.528 \end{gathered}

We can then find the angle to be


\begin{gathered} \theta=\tan ^(-1)(0.528) \\ \theta=27.8\degree \end{gathered}

The angle between the ladder and the wall is 27.8°.

A ladder is leaning against the top of an 8.9 m wall. If the bottom of the ladder-example-1
A ladder is leaning against the top of an 8.9 m wall. If the bottom of the ladder-example-2
User Vojta
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